Surname Centre Number Candidate Number Other Names 0 GCSE 4370/05 MATHEMATICS LINEAR PAPER 1 HIGHER TIER A.M. WEDNESDAY, 6 November 2013 2 hours CALCULATORS ARE NOT TO BE USED FOR THIS PAPER For s use Question Maximum Mark Mark Awarded ADDITIONAL MATERIALS A ruler, a protractor and a pair of compasses may be required. INSTRUCTIONS TO CANDIDATES Use black ink or black ball-point pen. Write your name, centre number and candidate number in the spaces at the top of this page. Answer all the questions in the spaces provided. Take as 3 14. 1. 6 2. 4 3. 8 4. 7 5. 4 6. 3 7. 7 8. 5 9. 4 4370 050001 INFORMATION FOR CANDIDATES You should give details of your method of solution when appropriate. Unless stated, diagrams are not drawn to scale. Scale drawing solutions will not be acceptable where you are asked to calculate. The number of marks is given in brackets at the end of each question or part-question. You are reminded that assessment will take into account the quality of written communication (including mathematical communication) used in your answer to question 7. 10. 5 11. 3 12. 11 13. 4 14. 2 15. 6 16. 9 17. 5 18. 7 Total 100 CJ*(A13-4370-05)
2 Formula List a Area of trapezium = 1 2 (a + b)h h b Volume of prism = area of cross-section length crosssection length Volume of sphere = 4 r 3 3 Surface area of sphere = 4 r 2 r Volume of cone = 1 3 r 2 h Curved surface area of cone = rl l r h In any triangle ABC C Sine rule a sin A b = sin B = c sin C b a Cosine rule a 2 = b 2 + c 2 2bc cos A Area of triangle = 1 2 ab sin C A c B The Quadratic Equation The solutions of ax 2 + bx + c = 0 where a 0 are given by b b ac x = ± ( 2 4 ) 2a
3 1. Given that f = 3, g = 2 and h = 5, find the value of the following expressions. (a) f 2 g h [2] (b) (2h) 3 [2] 4370 050003 (c) g f + 1 h [2] Turn over.
4 2. Tom collected 100 logs and measured their lengths in centimetres. The table below shows a grouped frequency distribution of his results. Length of log, l cm 50! l X 55 55! l X 60 60! l X 65 65! l X 70 70! l X 75 Frequency 4 18 38 30 10 (a) On the graph paper below, draw a grouped frequency diagram to show this data. [2] Frequency 40 30 20 10 0 45 50 55 60 65 70 75 Length of log, l cm
(b) Billy also collected and measured the lengths of some logs. The grouped frequency diagram of his results is shown below. 5 Frequency 40 30 20 10 0 45 50 55 60 65 70 75 Length of log, l cm 4370 050005 (i) How many logs did Billy collect and measure? [1] (ii) Was it Tom or Billy who collected the longer logs, on average? [1]... Explain how the grouped frequency diagrams help you to decide. Turn over.
3. 6 Pasta with cheese and asparagus sauce Serves 4 people Ingredients: 4 ounces Butter 8 ounces Asparagus 12 ounces Pasta 1 Onion 2 tablespoons Stock 2 cup Cream 3 3 ounces Cheese The recipe in Tamara s cookery book for pasta with cheese and asparagus sauce is shown above. Information to convert units is also given, as follows: 1 cup is approximately 240 ml 4 ounces is approximately 115 g 1 tablespoon is 15 ml
7 (a) Complete the recipe for serving 8 people using ml and g. [4] Pasta with cheese and asparagus sauce Serves 8 people Ingredients:... g Butter... g Asparagus 4370 050007... g Pasta... Onions... ml Stock... ml Cream... g Cheese 1 (b) Tamara has a 2 litre carton of cream. She has large quantities of all the other ingredients. Calculate the largest number of portions of pasta with cheese and asparagus sauce that Tamara can make using as much of the cream as possible. [4] Turn over.
4. (a) Enlarge the shape shown on the grid by a scale factor of 2, using A as the centre of enlargement. [3] A 8 (b) Reflect the triangle in the line y = x. [2] y 8 6 4 2 8 6 4 2 0 2 4 6 8 x 2 4 6 8
9 (c) Rotate the triangle shown on the grid below through 90 anticlockwise about the point ( 2, 4). [2] y 8 6 4 2 8 6 4 2 0 2 4 6 8 x 2 4 4370 050009 6 8 Turn over.
10 5. (a) Expand y(y 5 + 3). [2] (b) Factorise 4x 3 2x. [2] 6. Manilo won some money. 1 He gave each of his close friends of the money he won. 24 2 He kept the remaining of the money for himself. 3 How many close friends does Manilo have? [3]
11 7. You will be assessed on the quality of your written communication in this question. Dafydd works with his section manager in a department store. He has a salary of 17 000 per annum and he usually receives a bonus every year. Dafydd has to make a choice about which bonus to take from those offered by the store this year. He can either have the smaller share when 2500 is shared in the ratio 2 : 3 with his section manager or a sum of money equal to 6 % of his salary. Which of these two bonus offers should Dafydd accept? You must show your working and give a reason for your choice. [7] 4370 050011 Turn over.
12 8. Martha is laying out a new design for a flowerbed in her garden, as shown in the diagram below. x flowerbed 105 50 Diagram not drawn to scale (a) Calculate the size of angle x. [2] x =...
13 (b) Martha has another flowerbed in the shape of a parallelogram. The longer sides measure twice the length of the shorter sides of the parallelogram. The perimeter of this flowerbed is 24 metres. Let the length of one of the shorter sides of the flowerbed be z metres. Form an equation in terms of z. Solve your equation to find the length of one of the shorter sides of the parallelogram. [3] 4370 050013 Turn over.
14 9. The graph of a straight line is shown below. 6 y 5 4 3 2 1 4 3 2 1 0 1 2 3 4 x 1 2 3 4 (a) 5 You are asked to match one of the equations given below with the straight line. Put a ring around your choice of equation. You must show your working or give an explanation for your choice of answer. [2] y = 4x+ 15 15 y = 4x 8y = 3x+ 12 8y = 3x+ 12 y = 4x+ 15 y = 1 x+ 15 2
15 (b) Find the coordinates of the midpoint of the straight line which joins (2, 4) and ( 2, 6). [2] (...,... ) Turn over.
16 10. (a) The nth term of a sequence is 3n 2 + 2n. Write down the first three terms of the sequence. [2] (b) The nth term of a sequence is 5n n 2. Find the 10th term of the sequence. [1] (c) Find the nth term of the sequence 9, 6, 1, 6, 15, 26,... [2]
17 11. Harriet invests a sum of money into a savings account that pays compound interest at 3% per annum. No further deposits or withdrawals are made. A spreadsheet is used to calculate the total amount, A, in Harriet s account. It contains the formula A = 220 1 03 x, where x is the number of years since the investment was started. (a) How much did Harriet initially invest in her savings account? [1] (b) Calculate the amount in Harriet s savings account after 1 year. [2] Turn over.
18 12. (a) Factorise x 2 4x 21 and hence solve x 2 4x 21 = 0. [3] (b) Solve 2x+ 3 + 4x+ 1 = 43. [4] 3 2 2
19 (c) Make e the subject of the following formula. [4] ( ) d 2 + e = 3 5 e Turn over.
20 13. The diagram shows a cylinder. P Q Diagram not drawn to scale The cylinder has radius r cm and height h cm. The points P and Q are on the circumferences at opposite ends of the cylinder. The point P is vertically above point Q. By considering the net of the cylinder, find an expression for the shortest distance from P to Q when travelling around the cylinder. Give your expression in terms of, h and r. [4]
21 14. A bag of potatoes weighs 3 kg to the nearest kilogram. A sack contains 5 bags of potatoes. Complete the following sticker to attach to this sack of potatoes. [2] This sack of 5 bags of potatoes weighs at least... kg Turn over.
22 15. The table shows some of the values of y = 4x 3 12x 2 for values of x from 1 to 3. (a) Complete the table by finding the value of y when x = 1 and x = 1. [1] x 1 0 5 0 0 5 1 1 5 2 2 5 3 y 3 5 0 2 5 13 5 16 12 5 0 (b) Using the graph paper below, draw the graph of y = 4x 3 12x 2 for values of x between 1 and 3. [2] y 1 0 1 2 3 x 5 10 15 20
23 (c) Write down the coordinates of the points on y = 4x 3 12x 2 where the gradient is zero. [1] (...,... ) and (...,... ) (d) When the line y = 8 8x is drawn between x = 1 and x = 3, it intersects the curve y = 4x 3 12x 2 at one point. Use your graph to find the coordinates of this point of intersection. [2] Turn over.
24.. 16. (a) Express 0 3427 as a fraction. [2] (b) Write down any three values of x for which is rational. [2] x 3 2 (c) Give an example of an irrational number (i) whose square is rational, [1] (ii) whose square is irrational. [1] ( ) (d) Evaluate 32 + 2 2. [3]
25 17. The histogram shows the times taken by people in a group to climb a set of stairs. Frequency density 1 2 1 0 0 8 0 6 0 4 0 2 0 0 10 20 30 40 50 60 70 80 90 100 Time, t seconds (a) Calculate the number of people in the group. [3] (b) Calculate an estimate for the number of people who climbed the stairs in less than 65 seconds. [2] Turn over.
26 18. Rhodri has four pairs of shoes. The colours of the pairs of shoes are red, purple, black and white. The shoes are kept in a trunk in a dark room. Rhodri selects two shoes at random. Calculate the probability that Rhodri selects (a) two shoes, neither of which is purple, [3] (b) a matching pair of shoes. [4] END OF PAPER
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